How Long Does It Take for a Damped Oscillator's Energy to Halve?

[iamtrojan3]

Homework Statement

A mass M is suspended from a spring and oscillates with a period of 0.880 s. Each complete oscillation results in an amplitude reduction of a factor of 0.96 due to a small velocity dependent frictional effect. Calculate the time it takes for the total energy of the oscillator to decrease to 0.50 of its initial value.

Homework Equations

N oscillations=(initial amplitude)x(factor)^N
E=Eo*e^(-t/Tau)
Tau = m/b

The Attempt at a Solution

I really have no idea on how to approach this problem. I need to find tau, which is m/b, but idk what b is. if i have tau, the E on both sides cancel and I'm left with
1/2 = e^-t/tau. t = tau ln (2)
So basicly i need to find tau.

Thanks!

 

[kuruman]

Ignore m/b. What fraction of the initial energy is left after one oscillation?
Ans. 0.96²
After two oscillations?
Ans. 0.96²*0.96²
After n oscillations?
...

 

[iamtrojan3]

i got 16.97 as n. it works because .96^17 = ~ 0.499

So if that's true, 0.88 which is the period * 16.97 which gives me 14.94 seconds.

This makes sense except the answer's still wrong?

 

[iamtrojan3]

OK I'm retarded. n = 7.47

My friend here said not to do .96squared and woulnd't tell me why. So i blame her.

Thanks again =D

 

[kuruman]

Your friend is correct. I got 7.53 s (close enough). Initially, I assumed linearity where there was none.

I will get you started. Assume that the rate of change of the amplitude is proportional to the amplitude. Call the proportionality constant C. Then

[tex]\frac{dA}{dt} = - c A[/tex]

Solve this equation for A(t), and use the fact that A(0.88) = 0.96 A₀

Once you have A(t) you can find E(t), etc. etc.

This is a good problem. I learned something from it. Thanks.